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Mathlib.Topology.Algebra.ValuedField

Valued fields and their completions #

In this file we study the topology of a field K endowed with a valuation (in our application to adic spaces, K will be the valuation field associated to some valuation on a ring, defined in valuation.basic).

We already know from valuation.topology that one can build a topology on K which makes it a topological ring.

The first goal is to show K is a topological field, ie inversion is continuous at every non-zero element.

The next goal is to prove K is a completable topological field. This gives us a completion hat K which is a topological field. We also prove that K is automatically separated, so the map from K to hat K is injective.

Then we extend the valuation given on K to a valuation on hat K.

theorem Valuation.inversion_estimate {K : Type u_1} [DivisionRing K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] (v : Valuation K Γ₀) {x : K} {y : K} {γ : Γ₀ˣ} (y_ne : y 0) (h : v (x - y) < min (γ * (v y * v y)) (v y)) :
v (x⁻¹ - y⁻¹) < γ

The topology coming from a valuation on a division ring makes it a topological division ring [BouAC, VI.5.1 middle of Proposition 1]

Equations
instance ValuedRing.separated {K : Type u_1} [DivisionRing K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] [Valued K Γ₀] :

A valued division ring is separated.

Equations
theorem Valued.continuous_valuation {K : Type u_1} [DivisionRing K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] [Valued K Γ₀] :
Continuous Valued.v
instance Valued.completable {K : Type u_1} [Field K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] [hv : Valued K Γ₀] :

A valued field is completable.

Equations
noncomputable def Valued.extension {K : Type u_1} [Field K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] [hv : Valued K Γ₀] :

The extension of the valuation of a valued field to the completion of the field.

Equations
Instances For
    theorem Valued.continuous_extension {K : Type u_1} [Field K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] [hv : Valued K Γ₀] :
    Continuous Valued.extension
    @[simp]
    theorem Valued.extension_extends {K : Type u_1} [Field K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] [hv : Valued K Γ₀] (x : K) :
    Valued.extension (K x) = Valued.v x
    noncomputable def Valued.extensionValuation {K : Type u_1} [Field K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] [hv : Valued K Γ₀] :

    the extension of a valuation on a division ring to its completion.

    Equations
    • One or more equations did not get rendered due to their size.
    Instances For
      theorem Valued.closure_coe_completion_v_lt {K : Type u_1} [Field K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] [hv : Valued K Γ₀] {γ : Γ₀ˣ} :
      closure (K '' {x : K | Valued.v x < γ}) = {x : UniformSpace.Completion K | Valued.extensionValuation x < γ}
      noncomputable instance Valued.valuedCompletion {K : Type u_1} [Field K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] [hv : Valued K Γ₀] :
      Equations
      • One or more equations did not get rendered due to their size.
      @[simp]
      theorem Valued.valuedCompletion_apply {K : Type u_1} [Field K] {Γ₀ : Type u_2} [LinearOrderedCommGroupWithZero Γ₀] [hv : Valued K Γ₀] (x : K) :
      Valued.v (K x) = Valued.v x